Perfect Forests in Graphs and Their Extensions
Abstract
Let be a graph on vertices. For and a connected graph , a spanning forest of is called an -perfect forest if every tree in is an induced subgraph of and exactly vertices of have even degree (including zero). A -perfect forest of is proper if it has no vertices of degree zero. Scott (2001) showed that every connected graph with even number of vertices contains a (proper) 0-perfect forest. We prove that one can find a 0-perfect forest with minimum number of edges in polynomial time, but it is NP-hard to obtain a 0-perfect forest with maximum number of edges. Moreover, we show that to decide whether has a 0-perfect forest with at least edges, where is the parameter, is W[1]-hard. We also prove that for a prescribed edge of it is NP-hard to obtain a 0-perfect forest containing but one can decide if there existsa 0-perfect forest not containing in polynomial time. It is easy to see that every graph with odd number of vertices has a 1-perfect forest. It is not the case for proper 1-perfect forests. We give a characterization of when a connected graph has a proper 1-perfect forest.
Keywords
Cite
@article{arxiv.2105.00254,
title = {Perfect Forests in Graphs and Their Extensions},
author = {Gregory Gutin and Anders Yeo},
journal= {arXiv preprint arXiv:2105.00254},
year = {2021}
}